Solution:
Solve for I.(t) fort >0 as the switch moves from 20 V voltage source to 150 mA current source for t>0. t=0 R=2000 IL R2 Vs1 20V 10uF 100 L (1/4.1) H 150 mA
Please show all the work.
Part A Review Constants Find i(t) for t > 0. The switch in the circuit in (Figure 1) has been open for a long time before closing at t = 0. i(t) 30 30e-1000t mA 45,000te1000t i(t)= 15 - 15,000te-1000t _ 30e~1000t mA Figure 1 of 1 - 30e-1000t mA i(t)= 15+15,000te~1000t 30e-1000t mA i(t= 30 +15,000te-1000t O i(t) = 30 +45,000te 1000t - 30e-1000t mA 400 30e-1000t mA i(t= 15- 45,000te-1000t =0 + V3800...
1) For the circuit below, a) Find i(t) fort > 0 b) Find vu(t) fort > 0 [you can do this by using your answer to part a) and the relationship between voltage across an inductor and current through an inductor] c) Plot your answers to parts a) and b) on separate plots. I lists to V. (4) 2H 2) For the circuit below, if the capacitor is fully discharged for t < 0, a) Find i(t) fort 0 you...
please solve number 5 only
#4 Find i(t) fort <0 and > 0 for the following circuit (pts. 20) 1 = 0 40 Ω 30 Ω 20 V 3F: ΤΣ 0.5i 50 Ω #5. Determine vc, le and energy stored in the Capacitor and inductor in the following circuit under DC condition. 8 Ω (pts. 20) + Τι c 2F 10A 4Ω ele 0.5 Η 5Ω
[20 Q1: Calculate i(t) and v(t) fort>0 for the circuit of Fig. 1. Marks] i()81H 1Ω Fig. 1.
Problem 2: For the circuit shown below, find the following: The expression of i(t) fort > 0. The voltage vc (t) fort > 0 Calculate the peak energy stored in the capacitor Calculate the real power dissipated in the load formed by R and C. b) d) 40 UF + 0 -V-24 Ve0 400 Hz
(a) In the network in the accompanying figure,
find i(t) for t > 0.
(b) If
vC1(0–) = – 13 V, calculate
vC2(0–).
Please round all numbers to 3 significant digits.
(a) In the network in the accompanying figure, find i(t) fort > 0. (b) If Vc1(0-) = - 13 V, calculate vc2(0-). + °C (t) HE 0.8 F + 13e-5łu(t) v 0.2Fvc2(t) Please round all numbers to 3 significant digits. (a) i(t) = *e Edit A (b) Vc2(0-) =...
(1 point) If V (t) = 93e-660 mV and i (0) = 85 mA, find is (t) for t>0 <8 mF VS 8 20 mH + 24 mF iz(t) = -107.283e^(-36t)+19 mA
4. Find i(t) in the circuit shown in Figure 4 fort>0. Assume that the switch has been open for a very long time when t < 0. (25 points) t=0 29) 2? 3? i(t) Figure 4
Find i(t) for t>0 for the circuit in Fig. 16.37 Assume i(t)- [6(t) + 35(t)]mA 16.14 1Ω i(t) ist) ( 0.2 H 2Ω